Advertisements
Advertisements
рдкреНрд░рд╢реНрди
Assertion: If `x^(2//3) = 4`, then `x = 8`
Reason: `a^(m//n) = root(n)(a^m)`
рд╡рд┐рдХрд▓реНрдк
Both A and R are true and R is the correct reason for A.
Both A and R are true but R is the incorrect reason for A.
A is true but R is false.
A is false but R is true.
MCQ
рдЕрднрд┐рдХрдерди рдФрд░ рддрд░реНрдХ
Advertisements
рдЙрддреНрддрд░
Both A and R are true and R is the correct reason for A.
Explanation:
Let’s analyze:
Assertion:
If `x^(2/3) = 4`, then `x = 8`
To solve:
`x^(2/3) = 4`
⇒ `x = 4^(3/2)`
Now compute:
`4^(3/2) = (sqrt(4))^3 = 2^3 = 8`
So, Assertion is true
Reason:
`a^(m/n) = root(n)(a^m)`
This is correct. That’s the definition of rational exponents.
shaalaa.com
рдХреНрдпрд╛ рдЗрд╕ рдкреНрд░рд╢реНрди рдпрд╛ рдЙрддреНрддрд░ рдореЗрдВ рдХреЛрдИ рддреНрд░реБрдЯрд┐ рд╣реИ?
